Math, asked by roshanjt20, 1 month ago

3 equivalent rational number for 10/8 & - 10/30

Answers

Answered by abnormal8904
0

Answer:

which standard?

Step-by-step explanation:

3 equivalent rational number for 10/8 & - 10/30

Answered by shruthi0601
0

1) \frac{10}{8}

To find, three equivalent rational numbers.

Multiplying \frac{10}{8} with 2 in the numerator and denominator

\frac{10(2)}{8(2)\\} = \frac{20}{16}

Multiplying \frac{10}{8} with 3 in the numerator and denominator

\frac{10(3)}{8(3)} = \frac{30}{24}

Multiplying \frac{10}{8} with 4 in the numerator and denominator

\frac{10(4)}{8(4)} = \frac{40}{32}

So, three equivalent rational numbers of \frac{10}{8} are \frac{20}{16}, \frac{30}{24} and \frac{40}{32}

2) \frac{-10}{30}

To find, three equivalent rational numbers.

Multiplying \frac{-10}{30} with 2 in the numerator and denominator

\frac{-10(2)}{30(2)} = \frac{-20}{60}

Multiplying \frac{-10}{30} with 3 in the numerator and denominator

\frac{-10(3)}{30(3)} = \frac{-30}{90}

Multiplying \frac{-10}{30} with 4 in the numerator and denominator

\frac{-10(4)}{30(4)} = \frac{-40}{120}

So, three equivalent rational numbers of \frac{-10}{30} are \frac{-20}{60}, \frac{-30}{90} and \frac{-40}{120}

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